1,081 research outputs found
The GHZ/W-calculus contains rational arithmetic
Graphical calculi for representing interacting quantum systems serve a number
of purposes: compositionally, intuitive graphical reasoning, and a logical
underpinning for automation. The power of these calculi stems from the fact
that they embody generalized symmetries of the structure of quantum operations,
which, for example, stretch well beyond the Choi-Jamiolkowski isomorphism. One
such calculus takes the GHZ and W states as its basic generators. Here we show
that this language allows one to encode standard rational calculus, with the
GHZ state as multiplication, the W state as addition, the Pauli X gate as
multiplicative inversion, and the Pauli Z gate as additive inversion.Comment: In Proceedings HPC 2010, arXiv:1103.226
If physics is an information science, what is an observer?
Interpretations of quantum theory have traditionally assumed a "Galilean"
observer, a bare "point of view" implemented physically by a quantum system.
This paper investigates the consequences of replacing such an
informationally-impoverished observer with an observer that satisfies the
requirements of classical automata theory, i.e. an observer that encodes
sufficient prior information to identify the system being observed and
recognize its acceptable states. It shows that with reasonable assumptions
about the physical dynamics of information channels, the observations recorded
by such an observer will display the typical characteristics predicted by
quantum theory, without requiring any specific assumptions about the observer's
physical implementation.Comment: 30 pages, comments welcome; v2 significant revisions - results
unchange
Generalized Color Codes Supporting Non-Abelian Anyons
We propose a generalization of the color codes based on finite groups .
For non-abelian groups, the resulting model supports non-abelian anyonic
quasiparticles and topological order. We examine the properties of these models
such as their relationship to Kitaev quantum double models, quasiparticle
spectrum, and boundary structure.Comment: 17 pages, 8 figures; references added, typos remove
Towards Verifying Nonlinear Integer Arithmetic
We eliminate a key roadblock to efficient verification of nonlinear integer
arithmetic using CDCL SAT solvers, by showing how to construct short resolution
proofs for many properties of the most widely used multiplier circuits. Such
short proofs were conjectured not to exist. More precisely, we give n^{O(1)}
size regular resolution proofs for arbitrary degree 2 identities on array,
diagonal, and Booth multipliers and quasipolynomial- n^{O(\log n)} size proofs
for these identities on Wallace tree multipliers.Comment: Expanded and simplified with improved result
Non-Pauli topological stabilizer codes from twisted quantum doubles
It has long been known that long-ranged entangled topological phases can be exploited to protect quantum information against unwanted local errors. Indeed, conditions for intrinsic topological order are reminiscent of criteria for faithful quantum error correction. At the same time, the promise of using general topological orders for practical error correction remains largely unfulfilled to date. In this work, we significantly contribute to establishing such a connection by showing that Abelian twisted quantum double models can be used for quantum error correction. By exploiting the group cohomological data sitting at the heart of these lattice models, we transmute the terms of these Hamiltonians into full-rank, pairwise commuting operators, defining commuting stabilizers. The resulting codes are defined by commuting non-Pauli stabilizers, with local systems that can either be qubits or higher dimensional quantum systems. Thus, this work establishes a new connection between condensed matter physics and quantum information theory, and constructs tools to systematically devise new topological quantum error correcting codes beyond toric or surface code models
Narrowing-based Optimization of Rewrite Theories
Partial evaluation has been never investigated in the context of rewrite theories that allow concurrent systems to be specified by means of rules, with an underlying equational theory being used to model system states as terms of an algebraic data type. In this paper, we develop a symbolic, narrowing-driven partial evaluation framework for rewrite theories that supports sorts, subsort overloading, rules, equations, and algebraic axioms. Our partial evaluation scheme allows a rewrite theory to be optimized by specializing the plugged equational theory with respect to the rewrite rules that define the system dynamics. This can be particularly useful for automatically optimizing rewrite theories that contain overly general equational theories which perform unnecessary computations involving matching modulo axioms, because some of the axioms may be blown away after the transformation.
The specialization is done by using appropriate unfolding and abstraction algorithms that achieve significant specialization while ensuring the correctness and termination of the specialization. Our preliminary results demonstrate that our transformation can speed up a number of benchmarks that are difficult to optimize otherwise.This work has been partially supported by the EU (FEDER) and the Spanish MCIU under grant RTI2018094403-B-C32,andbyGeneralitatValencianaundergrantPROMETEO/2019/098. JuliaSapiñahasbeensupported by the Generalitat Valenciana APOSTD/2019/127 grantAlpuente Frasnedo, M.; Ballis, D.; Escobar Román, S.; Sapiña Sanchis, J. (2020). Narrowing-based Optimization of Rewrite Theories. Universitat Politècnica de València. http://hdl.handle.net/10251/14557
Communication protocols and quantum error-correcting codes from the perspective of topological quantum field theory
Topological quantum field theories (TQFTs) provide a general,
minimal-assumption language for describing quantum-state preparation and
measurement. They therefore provide a general language in which to express
multi-agent communication protocols, e.g. local operations, classical
communication (LOCC) protocols. Here we construct LOCC protocols using TQFT,
and show that LOCC protocols induce quantum error-correcting codes (QECCs) on
the agent-environment boundary. Such QECCs can be regarded as implementing, or
inducing the emergence of, spacetimes on such boundaries. We investigate this
connection between inter-agent communication and spacetime using BF and
Chern-Simons theories, and then using topological M-theory.Comment: 52 page
Enumerating Independent Linear Inferences
A linear inference is a valid inequality of Boolean algebra in which each
variable occurs at most once on each side. Equivalently, it is a linear rewrite
rule on Boolean terms that constitutes a valid implication. Linear inferences
have played a significant role in structural proof theory, in particular in
models of substructural logics and in normalisation arguments for deep
inference proof systems.
In this work we leverage recently developed graphical representations of
linear formulae to build an implementation that is capable of more efficiently
searching for switch-medial-independent inferences. We use it to find four
`minimal' 8-variable independent inferences and also prove that no smaller ones
exist; in contrast, a previous approach based directly on formulae reached
computational limits already at 7 variables. Two of these new inferences derive
some previously found independent linear inferences. The other two (which are
dual) exhibit structure seemingly beyond the scope of previous approaches we
are aware of; in particular, their existence contradicts a conjecture of Das
and Strassburger.
We were also able to identify 10 minimal 9-variable linear inferences
independent of all the aforementioned inferences, comprising 5 dual pairs, and
present applications of our implementation to recent `graph logics'.Comment: 33 pages, 3 figure
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